Solve the following system by using row reduction and write the solution in parametric vector form....
Solve the following system of equations. (Enter your answers as a comma-separated list. If there are infinitely many solutions, enter a parametric solution using t and/or s. If there is no solution, enter NONE.) 3y + 2z 4 2x-y-3z 2 2x 2y z6 (x, y, 2) Solve the following system of equations. (Enter your answers as a comma-separated list. If there are infinitely many solutions, enter a parametric solution using t and/or s. If there is no solution, enter NONE.)...
Use Gauss-Jordan row reduction to solve the given system of equations. HINT (See Examples 1-6.] (If there is no solution, enter NO SOLUTION. If the system is dependent, express your answer in terms of x, where y = y(x) and 2 = 2(x).) x + y - 22 = 4 X - Y - 52 = 0 (X, Y, 2) - ( -91,64, – 31 ) Need Help? Read It Watch It Talk to a Tutor Use technology to solve...
Use Gauss-Jordan row reduction to solve the given system of equations. HINT [See Examples 1-6.] (If there is no solution, enter NO SOLUTION. If the system is dependent, express your answer in terms of x, where y = y(x) and z = z(x).) -1/2x+y-1/2z=0 -1/2x-1/2y+z=0 x-1/2y-1/2z=0 (x,y,z)=
Solve the following system of three linear equations by creating (a) a row vector for x, y, and z, and (b) a column vector for x, y, and z (using matlab): -4x+3y+z=-18.2 5x+6y-2z=-48.8 2x-5y+4.5z=92.5
Solve the system. If the system has one unique solution, write the solution set. Otherwise, determine the number of solution the system, and determine whether the system is inconsistent, or the equations are dependent. - 3x -Y -3z = 11 3x +3y-6z = -18 2x +2y +3z = 5 Submit Act
Problem 2. a) Use Gauss-Jordan elimination (reduced row echelon form) to solve the system of linear equations T y x +2y +3z -3w = or explain why the system is inconsistent. If the system is consistent, write down the solution in a vector form. NO CREDIT will be given, if any other method is used.
(6 points) Evaluate the following system using the augmented matrix method. When performing row reduction, be sure to indicate your row operations. x 2x -x + 2y + 5y + 4y – + – 2= z = 2z = -3 1 3 (12 points) Evaluate the following system using Gauss-Jordan elimination. When per- forming row reduction, be sure to indicate your row operations. 2x x -x (a) – + + y + z = y + 2z = 3y +...
3. Write the following systems of linear equations using augmented matrix form a. 6x+7y= -9 X-y= 5 b. 2x-5y= 4 4x+3y= 5 C. x+y+z= 4 2x-y-z= 2 -x+2y+3z= 5 4. Solve the following Systems of linear equations using Cramer's Rule a. 6x-3y=-3 8x-4y= -4 b. 2x-5y= -4 4x+3y= 5 c. 2x-3y+z= 5 X+2y+z= -3 x-3y+2z= 1
Using MATLAB Write a MATLA code to solve the following system of linear equations: -x + y + 4z = -2 20y + 3x - 1z = 3 3z + 2y + 6z - 3 = 0
Your problem is to find the optimal solution to the following linear programming model where X, Y and Z represent the amounts of products X, Y and Z to produce in order to minimize some cost. Min 4X + 2Y + 6Z s.t. 6X + 7Y + 10Z ≤ 80 (1) 2X + 4Y + 3Z ≤ 35 (2) 4X + 3Y + 4Z ≥ 30 (3) 3X + 2Y + 6Z ≥ 40 (4) X,Y,Z ≥...